option, Truck A, offers a flat fee of $25 and $.40 per mile. Truck B offers a flat fee of $30 and $.25 per mile.
What are you supposed to be solving for? (:
The first option, Truck A, offers a flat fee of $25 and $.40 per mile. Truck B offers a flat fee of $30 and $.25 per mile.
The distance between Meagan's house from her mother's the measurement is in the shape of a trianagle 6 miles, 8 miles, ? miles,
Please include the entire question. You still have not said what the problem is, only what the distance and rates are.
9/2
To determine which option is more cost-effective, we need to compare the costs of Truck A and Truck B for a specific distance.
Let's say the distance is represented by "m" miles.
For Truck A, the cost can be calculated using the formula: Cost_A = $25 + ($0.40 * m)
For Truck B, the cost can be calculated using the formula: Cost_B = $30 + ($0.25 * m)
To compare the two options, we can set up an equation:
Cost_A = Cost_B
$25 + ($0.40 * m) = $30 + ($0.25 * m)
Now, let's solve the equation to find the break-even point.